Obtaining the pseudoinverse solution of singular range-symmetric linear systems with GMRES-type methods

Abstract

It is well known that for singular inconsistent range-symmetric linear systems, the generalized minimal residual (GMRES) method determines a least squares solution without breakdown. The reached least squares solution may be or not be the pseudoinverse solution. We show that a lift strategy can be used to obtain the pseudoinverse solution. In addition, we propose a new iterative method named RSMAR (minimum A-residual) for range-symmetric linear systems A x= b. At step k RSMAR minimizes \| A rk\| in the kth Krylov subspace generated with \ A, r0\ rather than \| rk\|, where rk is the kth residual vector and \|·\| denotes the Euclidean vector norm. We show that RSMAR and GMRES terminate with the same least squares solution when applied to range-symmetric linear systems. We provide two implementations for RSMAR. Our numerical experiments show that RSMAR is the most suitable method among GMRES-type methods for singular inconsistent range-symmetric linear systems.